Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted with FRP composites

Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted with FRP composites

Accepted Manuscript Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted with FRP composites Anant Parghi, M. ...
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Accepted Manuscript Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted with FRP composites Anant Parghi, M. Shahria Alam PII: DOI: Reference:

S0263-8223(16)31632-4 http://dx.doi.org/10.1016/j.compstruct.2016.10.094 COST 7920

To appear in:

Composite Structures

Received Date: Accepted Date:

22 August 2016 21 October 2016

Please cite this article as: Parghi, A., Shahria Alam, M., Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted with FRP composites, Composite Structures (2016), doi: http://dx.doi.org/ 10.1016/j.compstruct.2016.10.094

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Seismic collapse assessment of non-seismically designed circular RC bridge piers retrofitted

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with FRP composites

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Anant Parghi1 and M. Shahria Alam

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School of Engineering, The University of British Columbia, Kelowna, V1V 1V7 - BC, Canada

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Abstract

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The seismic vulnerability of bridge pier is generally expressed in terms of the fragility curves,

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which reveals the conditional probability that the structural demand due to different levels of

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earthquake intensities exceeding the structural capacity at particular damage state. This research

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represents results of fragility curve development of typical single circular reinforced concrete

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(RC) bridge pier. The different parameters are considered in the analysis which includes the

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strength of concrete, yield strength and amount of longitudinal steel rebar, level of axial load and

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shear span-depth ratio, and carbon fiber reinforced polymer confinement layer. Nonlinear static

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pushover analysis (NSPA), and incremental dynamic analysis is conducted using suits of

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earthquake ground motions with scaled peak ground acceleration (PGA) to investigate the

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nonlinear dynamic behavior of the retrofitted piers. The impact of various parameters is

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evaluated under probability point of view in terms of its influence on the bridge pier fragility

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curve. Considering collapse drift as demand parameters, fragility curves were generated with

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different parameters of non-seismically designed RC circular bridge piers. It was observed that

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the amount of reinforcement, shear span-depth ratio, and level of the axial load could

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significantly affect the collapse fragility curve of the retrofitted bridge piers.

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Keywords: Fiber reinforced polymer; bridge piers; fragility curve; confinement ratio; nonlinear

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analyses; collapse assessment 1

Corresponding Author, Email: [email protected] Tel: +1.250.807.9397, Fax: +1.250.807.9850

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1. Introduction

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Bridges are considered as an important element in highway networks, since they play a critical

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role in the development of country’s economic activity. The bridges can connect cities and

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countries by providing links, render smooth, and quick transportation. In the early development

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of country, measures were adopted to improve transportation safety, accessibility, and economic

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efficiency. Conversely, large numbers of existing reinforced concrete (RC) highway bridges in

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North America were built when the seismic design guidelines were at an early stage of

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development. Moreover, earthquake hazard levels have been recently increased throughout the

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globe, which might affect the seismic performance of existing highway bridges. On one hand,

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truck loads have increased significantly over the years; and the other hand, bridges are restricted

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to their load capacity. Therefore, these structures cannot allow heavier trucks/traffic volume

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without proper strengthening. One option is replacing a deficient structure with a new once;

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while new construction is normally expensive, time consuming and even impractical. For

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instance, for the stoppage of an obsolete but a critical bridge in a busy highway system, the

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replacement of bridge could cause many difficulties. Accordingly, the other alternative of

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strengthening the bridge structures based on the current codes becomes the only possibility under

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certain conditions. For example, strengthening beams and piers is essential to provide much

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desirable load carrying capacity.

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Various rehabilitation methods are available to upgrade the structural performance of

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existing sub-standard bridges. The sub-standard bridge pier can be defined as the bridge piers,

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which are constructed with inadequate lateral ties and longitudinal spliced length reinforcement.

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In the past three decades, concrete and steel plate jacketing has been frequently used for the

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structural strengthening of deficient structures. In such a way, significant improvement in the

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ultimate flexural strength and ductility could be achieved. However, these techniques have many

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problems associated with their use. For example, in the case of concrete jacketing, it is labor

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intensive, time consuming, shrinkage and bonding problem to the substrate concrete. Another

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main drawback is the reduction of available floor-space, since jacketing enriches the cross-

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section dimension, which leads to a substantial mass increase, stiffness modification, and

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consequently modification of the dynamic characteristics of the entire structure. The steel plate

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jacketing needs specialized heavy equipment at the work site. Moreover, high cost and likelihood

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of steel corrosion at the interface of steel and concrete resulting in the bond deterioration are

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considered as problems. Other disadvantages are the difficulty in manipulating heavy steel plates

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in tight construction site, needs scaffolding, and limitation in available plate lengths (which

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required in the case of flexural strengthening of long girders) resulting in the necessity for the

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joints.

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The rapid deterioration of bridge infrastructure and limited funding for maintenance have

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promoted the use of advanced fiber reinforced polymer (FRP) composites as sustainable repair

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and strengthening materials. For the last two decades, a significant research has been focused on

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the application of FRP for the rehabilitation of RC buildings and bridges. Numerous researchers

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have considered FRP as an external reinforcement to upgrade the seismic resistance of the RC

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piers [1], [2], [3], [4]. FRP sheets/strips have been used as retrofitting and rehabilitation materials

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due to their exceptional engineering properties, such as, high strength-to-weight ratio, high

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stiffness with excellent corrosion resistance, low density, long fatigue life. Therefore, they can

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offer a great potential for cost-effective retrofitting method for the concrete structures [5].

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There are several studies, which attempted to explore the feasibility of FRP confinement

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techniques for the seismic retrofit of concrete piers. Some of these studies Elsanadedy and

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Haroun [2], Saadatmanesh et a. [6], Xiao and Ma [7], Chang et al. [8], Han et al. [9] investigated

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the lateral load carrying capacity of RC pier after applying FRP confinement technique. The

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results of these studies have demonstrated that the shear failure could be prevented and

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significant improvement could be obtained in the ductility of the retrofitted piers. Saadatmanesh

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et a. [6] conducted an experimental investigation on the seismic behavior of on 1/5-scaled RC

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pier strengthened with glass fiber reinforced polymer (GFRP) straps. The results showed that the

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seismic resistance of retrofitted piers improves significantly and the longitudinal reinforcement

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are prevented from buckling under lateral cyclic loading. Chang et al. [8] performed pseudo-

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dynamic tests on the as-built and carbon fiber reinforced polymer (CFRP) strengthened

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rectangular RC bridge piers under near-fault ground motions. They found that the seismic

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performance of damaged concrete bridge piers could be effectively improved after retrofitting by

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CFRP. Elsanadedy and Haroun [2] conducted tests on the as-built and FRP composite-wrapped

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scaled models of circular and square RC piers with inadequate lap-spliced length under

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simulated seismic loading. The results demonstrated that the as-built pier suffers from the brittle

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failure due to the bond deterioration of the lap-spliced of longitudinal reinforcement. The circular

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retrofitted piers improved ductility and enhanced seismic performance, while the ductility

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improvement for the square retrofitted pier is limited compared to the as-built pier. Han et al. [9]

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studied the seismic behavior of hollow rectangular bridge piers retrofitted with carbon FRP. The

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results reported that failure modes and damage regions would be changed, and the ductility and

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dissipated energy of the retrofitted piers could improve greatly; however, the lateral load

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capacity did not improve comparatively. Xiao and Ma [7] studied as-built and glass FRP

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composite-wrapped ½-scaled models of circular bridge piers with poor lap splice detailing. They

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reported that the as-built model pier exhibited brittle failure due to bond deterioration of the lap-

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spliced longitudinal reinforcement. The brittle failure was prevented in the repaired and

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retrofitted piers, and dramatic improvement was observed in the ductility and energy dissipation

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capacity of piers.

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In this paper, the seismic vulnerability assessment of non-seismically designed RC bridge

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piers retrofitted with FRP jacketing is conducted. A finite element model of retrofitted and

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unretrofitted circular RC bridge piers are first validated with experimental results and then,

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nonlinear analyses are conducted. The structural response of the retrofitted bridge piers under

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severe seismic events are considerably different compared to regular bridge pier. The paper

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focuses on quantifying the inelastic demand and capacities of FRP retrofitted non-seismically

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designed circular RC bridge piers using nonlinear static pushover analyses (NSPA), and

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incremental dynamic analyses (IDA). The behavior and response of the FRP retrofitted piers are

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investigated using nonlinear analyses by a fiber element model with suitable cyclic constitutive

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laws of FRP-confined concrete. IDA is conducted with finite element numerical models of the

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FRP retrofitted piers to a family of 20 earthquake ground motions scaled with different intensity

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measures (IM). With respect to IM, such as peak ground acceleration (PGA), the maximum

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responses in terms of governing engineering demand parameters (EDP), such as the maximum

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drift or deformation, and ductility demand of the structure are estimated to compare

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performances of retrofitted bridge piers. The results of this study will be useful for the decision

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makers for developing strategies and practices to improve currently used bridge management

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systems.

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2. Design and Geometry of Bridge Pier

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This section briefly explains the design and configuration of different RC bridge piers. The RC

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circular bridge piers are assumed to be located in Vancouver, BC, Canada and is non-seismically

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designed without consideration of the current seismic design guidelines. The diameter of piers is

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fixed to be 400 mm in all the piers. Several parameters affect the design and behavior of the

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bridge piers. The important variables of this parametric study are selected as the compressive

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strength of concrete, f c' , the yield strength, fy, and amount of longitudinal reinforcement, ρl, FRP

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confinement layers, n, axial load, P, and shear span-depth ratio, l/d. Table 1 lists the factors and

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associated values considered in this article. These parameters are selected based on literature

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[10], [11], [12]. For each parameter, two different values (levels) are considered.

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Table 2 shows a summary of the FRP retrofitted piers analyzed in this article. A total of 12

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non-seismically RC circular bridge piers are designed in order to study the effect of different

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parameters on the seismic vulnerability of FRP retrofitted piers. One parameter at a time is

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varied and the others are kept constant. As reported by Parghi and Alam [13], the interaction of

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parameters has an insignificant effect on the response, and therefore, they are not considered in

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this article. The diameter and number of longitudinal bars change for different rebar percentages.

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6mm circular stirrups are used at 250 mm spacing as the lateral reinforcement in all of the piers.

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Figure 1 displays the geometry and reinforcement detailing of the RC pier. In order to ensure that

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the dominant failure mode will be a flexural failure (i.e. avoiding shear failure), and two different

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aspect ratios (4 and 7) are considered.

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3. Numerical Investigation of Bridge Piers

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3.1 Bridge pier model

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The finite element model of the bridge pier is approximated as a continuous 2-D finite element

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frame using the nonlinear analysis program SeismoStruct [14]. Figure 2(a) and Figure 2(b) show

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a typical FRP retrofitted pier and a three-dimensional (3-D) model, respectively. In order to

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consider material nonlinearity, 3-D inelastic displacement-based frame elements has been used

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for modeling the piers. To generate the hysteretic relationship for the circular piers, fiber-based 6

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model is employed. By specifying cross-section pieces along the height of the element, the

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distribution of inelastic deformation and forces are determined. In addition to the fiber elements,

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to capture bond-slip rotations at the pier-footing interface, a nonlinear rotational spring element

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is used in the model. The rotational spring element is defined with a zero-length element in

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SeismoStruct [14]. A rotational spring at the bottom of the pier indicates the longitudinal

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reinforcement pullout from the footing. Its properties was used from Gallardo-Zafra and

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Kawashima [15]. Figure 2(c) characterizes the pier fiber and its sub-section, which is divided

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into cover concrete, core concrete and steel reinforcement. At the numerical integration points,

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each element is characterized by numerous cross-sections where each section is sub-divided into

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a number of fiber under uniaxial state of stress. For concrete compressive strength of 35 MPa,

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the nonlinear variable confinement model proposed by Madas and Elnashai [16], which follows

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the constitutive relationship presented by Mander et al. [17], and the cyclic rules proposed by

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Martinez-Rueda and Elnashai [18] is model implemented in the analyses. For the FRP confined

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concrete, Ferracuti and Savoia [19] model, which follows the constitutive relationship and cyclic

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rules proposed by Mander et al. [17], and Yankelevsky and Reinhardt [20] under compression

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and tension, respectively is used. This model employs Spoelstra and Monti’s [21] model for the

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confining effect of FRP jacket. For the FRP materials, linear elastic behavior up to the rupture

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with zero compressive strength is considered. Menegotto and Pinto [22] steel model with

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Filippou et al. [23] isotropic strain hardening property is adopted as the constitutive model of

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rebar to develop the analytical model. When the pier is jacketed by FRP sheets, the cover

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concrete is considered as the concrete confined by the FRP jacket, while the core concrete is

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considered as the concrete confined by FRP and the transverse reinforcements.

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3.2 Model calibration with experimental results

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In order to calibrate the numerical models, the circular RC pier experimentally studies by

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Kawashima et al. [24] is adopted in this research. The pier specimen has a diameter of 400 mm,

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and an effective height of 1350 mm. The pier is reinforced with 12-15M steel (dia. of 16 mm)

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longitudinal reinforcement ratio of 1.89, and 0.128% transverse steel (dia. of 6 mm), with 300

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mm center to center spacing, and the clear cover of concrete of 35 mm. The confined region,

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where carbon fiber reinforced polymer (CFRP) jackets are applied from the base of the pier, has

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a height of 1000 mm. An axial compressive load of 188.4 kN representing 5% of the axial

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capacity is applied at the top of the pier. The pier is free on top and flexural dominated in the

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reversed cyclic load test. The specified compressive strength of the unconfined concrete, the

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yield strength of longitudinal and transverse reinforcements is considered as 35, 374, and 363

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MPa, respectively. The CFRP retrofitting technique adopted in this paper is adapted from

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Kawashima et al. [24]. The CFRP composites have an initial stiffness, and an ultimate strain of

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266 GPa and 1.63%, respectively.

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Figure 3(a) and Figure 3(b) demonstrate the hysteretic behavior of as-built and CFRP

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retrofitted piers, respectively. In order to validate the numerical model, the CFRP retrofitted pier

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is modelled and analyzed using a finite element program SeismoStruct [14] under the

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displacement-controlled reversed cyclic loading history same as the experimental test [24]. The

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RC cantilever pier is displaced with an increment of 0.5% drift until reaching a maximum drift of

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5%. The numerical model of pier, retrofitted with a single layer of CFRP sheet representing the

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volumetric confinement ratio of 0.11%, is validated with the experimental results [24] . As

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shows in Figure 3(a) and Figure 3(b), the numerical model can capture the experimental response

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[24] in terms of initial and post elastic stiffness, and the ultimate load capacity with a good

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accuracy. Compared to the experimental results, the stiffness and capacity, respectively varies by

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3.5 and 3%.

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4. Nonlinear Static Pushover Analysis and the Flexural Limit States

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According to the performance-based design guidelines, structures are designed based on a

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damage limit state at which the loss of life is prohibited. However, the structure would be out of

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service for a certain time, which could withstand extensive structural and non-structural

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damages. The performance of the bridge pier can be quantified in terms of limit states with

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corresponding strain limits. In order to study the effect of different parameters of retrofitted

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circular bridge piers, four performance criteria have been considered: the displacements (∆) and

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base shear (V) at the onset of first yielding of longitudinal steel (∆y, Vy), first crushing of core

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concrete (∆crush, Vcrush), first buckling of longitudinal steel (∆buck, Vbuck) and first fracture of

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longitudinal steel (∆fract, Vfract) pier. In order to identify the limit states for all combinations of the

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retrofitted piers (Table 2), nonlinear static pushover analyses are conducted. The yielding of

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longitudinal steel reinforcement is assumed to take place at a tensile strain of steel fy/Es. The

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crushing strain of unconfined concrete varies from 0.0025 to 0.006 [25]. Consequently, Paulay

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and Priestley [10] recommended that the crushing strain of confined concrete is much higher and

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changes from 0.015 to 0.05. In the present analysis, the crushing of confined concrete is assumed

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to occur when the concrete compressive strain reaches 0.035. Longitudinal bar buckling and

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fracture are determined according to the equations proposed by Berry and Eberhard [26]. They

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proposed that the onset of bar buckling and fracture are best predicted as functions of the

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effective confinement ratio, ρeff. Buckling and fracture of the longitudinal bar are defined as the

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points when the tensile strain in the extreme tensile steel fibre reaches 0.045 and 0.046,

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respectively [26].

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As depicted in Table 3, and Figure 4 - Figure 9, different parameters affect the flexural

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performance of the FRP retrofitted bridge piers. For instance, as shown in Figure 3 - Figure 8, it

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can be observed that higher values of the parameters can increase the capacity of the piers.

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Yielding, bucking, and fracture of reinforcement, and crushing of core concrete are also

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presented in Figure 4 - Figure 9.

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From Figure 4, it is observed that 35 MPa concrete increases the pier yielding and crushing

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base shear capacities of 14 and 8.3%, respectively; while the buckling and fracture base shear

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capacities decrease by 4.4 and 4.3% compared to 20 MPa concrete. It could be attributed to the

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fact that for the low strength concrete (20 MPa), the FRP confinement is more effective which

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could give a higher deformability compared to the high strength concrete (35 MPa). Thus, low

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strength concrete shows a higher displacement for crushing, buckling, and fracture of the rebar.

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There is no difference in the yield displacement for 20 and 35MPa concrete. The results

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presented in Figure 4 indicate that the stiffness of both piers is quite similar until the yielding of

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the rebar. The results show that the stiffnesses of both piers are quite similar until cracking of the

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concrete. Once the concrete is cracked, the 20 MPa pier exhibits comparatively lower stiffness

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compared to 35 MPa concrete due to a lower modulus of elasticity of the concrete.

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From Figure 5, it can be observed that the yield strength of longitudinal reinforcement

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significantly affects the flexural performance of the FRP retrofitted bridge piers. For the high

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yield strength (400 MPa) reinforcement shows higher yielding, crushing, buckling and fracture

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base shear of 24.3, 27.3, 30.1 and 4.5%, and larger displacement by 28.6, 15.4, 27.3, 6.8, and

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4.7%, respectively compared to the lower yield strength (250 MPa).

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From Figure 6, it is observed that the amount of longitudinal steel considerably affects the

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flexural strength and limit states of the retrofitted bridge piers. For 2.5% longitudinal

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reinforcement ratio, the yielding, crushing, buckling and fracture base shear capacities are

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improved by 44.9, 48.7, 55.8, and 56.1% compared to that of 1% longitudinal steel. For 2.5%

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longitudinal reinforcement ratio, the yielding, buckling, and fracture displacements increase by

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14.3, 9.5, and 9.3%, respectively, but the crushing displacement decreases by 14.3% compared to

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that of 1% longitudinal steel.

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From Figure 7, it can be observed that at 20% axial load, the yielding, crushing, buckling,

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and fracture base shear increases by 41.5, 14.3, 7.4, and 7.2% compared to that of 10% axial

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load. The yielding displacement increases by 14.3% for 20% axial load compared to 10% axial

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load; and crushing, buckling and fracture displacements are almost the same for 20 and 10%

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axial load. The results presented in Figure 7 reveal that the stiffnesses of both piers are quite

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similar. The pier with 10% axial load has a higher deformation compared to 20% axial load pier.

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From Figure 8, it can be observed that the shear span-depth ratio significantly affects the

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flexural performance of the FRP retrofitted bridge piers. For the shear span-depth ratio of 7

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shows 52.6, 44.3, 100.6, and 101.7% lower yielding, crushing, buckling, and fracture base shear

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capacities, respectively compared to those having shear span-depth ratio of 4. For the shear span-

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depth ratio of 7, yielding, crushing, buckling, and fracture displacements increase by 57.1, 64.3,

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67.4 and 65.9%, respectively compared to those for the shear span-depth ratio of 4. According to

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the results presented in Figure 8, the shear span-depth ratio of 4 shows higher stiffness and lower

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deformability compared to the shear span-depth ratio of 7.

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From Figure 9, it can be observed that the FRP-confinement layer does not affect the

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flexural performance of the piers in terms of yielding, crushing, buckling, and fracture base

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shears and displacements. Similar base shear and displacement limit states are observed from 2

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and 3 layers of FRP confinement.

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5. Incremental Dynamic Analysis of Piers

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In order to predict the structural response under lateral load, NSPA is widely used. Conversely,

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during a seismic event the lateral load experienced by the structures is dynamic in nature; hence,

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nonlinear dynamic time history analysis will provide accurate estimation of structural response

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under a seismic load. Luco and Cornell [27] developed incremental dynamic analysis (IDA)

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method which is well explained in detail in Vamvatsikos and Cornell [28], and Yun et al. [29].

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IDA needs multiple nonlinear dynamic time history analyses of a structural model by scaling sets

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of seismic ground motion records based on adopted intensity measures (IM). Then, regression

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equations of engineering demand parameters (EDP), such as maximum drift at different intensity

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levels will be developed. The suite of different ground motions is properly chosen to cover the

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entire range of the model’s response from elastic to yield, and nonlinear inelastic which leads to

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global dynamic instability of structures. In IDA, different scaling factors should be selected for

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different piers. Here, PGA is selected as IM and the incremental scaling series in IDA ranges

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from 0.1g to 3.0g. Overall, when the maximum top drift of the piers exceeds certain level, it

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experiences dynamic instability with a large deformation or drift. In this article, a “collapse

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point” is considered as the first incidence of such large deformation or drift [28]. Though,

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Konstantinidis and Nikfar [30] reported that increase of an actual ground motion PGA value by

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a scaling factor does not certainly lead to reliable results; however, it will provide a better

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understanding of the behavior of the inelastic system over the range of different intensity

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measures. In portraying the inelastic demand, non-linear behavior in the collapsed state are

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defined. The collapse results are modeled by developing fragility curves at the collapse limit

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state.

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5.1 Selection of ground motions

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The properties of seismic ground motion differ in terms of frequency content, peak ground

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acceleration (PGA), and duration. Thus, dynamic time history analyses of structure for one

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ground motion record might not characterize the worst-case scenario. In order to incorporate the

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uncertainties and variability of ground motion records and their impact on the behavior of bridge

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piers, a suite of earthquake ground motions is required. Due to limited number of available

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earthquake records in Vancouver, British Columbia region (western Canada), a suite of 20

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ground motion histories are obtained from the Applied Technology Council [31] ground motion

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database. Table 4 shows the characteristics of the un-scaled seismic ground motion records

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including PGA, peak ground velocity (PGV), epicenter distance (R), and moment magnitude

285

(Mw) of the earthquake. These ground motion records have low to medium values of PGA, R, Mw

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and PGV, which are in the range of 0.22-0.73g, 8.7-98.2km, 6.5-7.6 and 17-70cm/sec,

287

respectively. It is assumed that these ground motions are considered to be representative of an

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earthquake motion in Vancouver. In this study, the horizontal components of ground motion

289

records are applied to the pier. The specified magnitude and distance ranges cover the

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predominant magnitudes and distances for Vancouver.

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Figure 10(a) shows the acceleration response spectrum of the recorded suits of 20 ground

292

motions with a 5% damping ratio. Figure 10(b) depicts different percentiles of acceleration

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response spectra with a 5% damping ratio, showing that the selected earthquake ground motions

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records are well representing the medium to strong intensity earthquake ground motion histories..

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5.2 Incremental dynamic analysis for pier collapse capacity

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For the retrofitted bridge piers, inelastic demands are estimated by conducting IDA. IDA curve is

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also known as dynamic pushover curve, which is the relationships between IM and EDP. These

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curves are generated using numerous ground motions, and each ground motion records are scaled

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to multiple levels of intensities [28].

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5.3 Dynamic pushover curve

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The incremental dynamic analysis is conducted for all the retrofitted bridge piers using the suite

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of 20 earthquake ground motion records. Figure 11- Figure 21 show the dynamic pushover curve

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of total base shear versus top lateral displacement for different compressive strengths of

304

concrete, yield strengths and amount of longitudinal reinforcement, axial loads, shear span-depth

305

ratios, and FRP layers. The dynamic pushover points closely coincide with the static pushover

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curves before the first yielding of the longitudinal reinforcement. It can be observed from Figure

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11- Figure 21 that the dynamic pushover curves demonstrate higher base shear values compared

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to those from the static pushover curves between first yielding and crushing of core concrete.

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5.4 Incremental dynamic analysis curve

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IDA curve results with all the combinations of parameters are used to identify IM values related

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to the collapse. Figure 22(a) - Figure 22(l) show the IDA curves of all the retrofitted piers with

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different adopted parameters (Table 2) and a set of IM values related to the onset of collapse for

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each ground motions. The overall characteristics of the IDA curves for maximum top drift ratio

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are different, the initial drift increases gradually with the seismic intensity level. Afterward, the

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drift increases rapidly when the seismic intensity level reaches a range of 0.2g to 0.4g for all of

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the piers (Figure 22). According to the results of IDA curves shown in Figure 22(a) - Figure

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22(l), the non-seismically designed piers show more vulnerability compared to the other bridge

318

piers. Failure modes obtained from the IDA curves at collapse level are summarized in Appendix

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Table A1.

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6. Collapse Fragility Assessment

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The fragility curves can be produced by using various methods, for instance, an expert opinion,

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damage data observed from field, laboratory testing, based on numerical simulations, or a

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combination of them [32], [33], [34], [35], [36], [37], [38]. In this research, analytical collapse

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fragility curves were generated based on IDA results using suits of 20 ground motion records

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scaled until it causes the collapse of the pier [28]. The analytical fragility curve exhibits

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advantages compared to other methods. For instance, in the case of analytical fragility curve, the

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analyst is free to choose the IM , at which analysis is to be conducted, and the number of analysis

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at each IM [39]. Generally, the fragility curves are mathematical functions which describe the

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conditional probability that a structure can experience damage by exceeding or reaching a

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specific level of damage state as a function of demand (drift or ductility), represented by EDP IM

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(e.g. PGA). In the seismic vulnerability assessment of structure, fragility curves are obtained

332

from IDA [40].. The collapse fragility function gives a probability that a structure would collapse

333

as a function of a specific IM. The collapse fragility assessment can be described using Eq. (1) as

334

a lognormal cumulative distribution function (CDF) reported by [39].  ln ( x θ )  Pc ( C | IM = x ) = Φ    β 

(1)

335

where Pc(C|IM = x) represents the probability of collapse at a given ground motion with IM = x,

336

Φ(.) is the standard normal CDF, θ is the collapsed median intensity of the fragility function (IM

337

level with 50% probability of collapse not being exceeded), and β is the logarithmic standard

338

deviation. Eq. (1) indicates the assumption of lognormality of the IM values of the ground

339

motions causing the collapse of specific structures [39]. Calibrating Eq. (1) of the pier needs an

340

estimation of θ and β from the IDA results. Figure 23 shows the linear regression models of the

341

median and standard lognormal dispersion for all the combinations of parameters. Table 5 15

342

depicts a summary of the values of linear regression models of the median and standard

343

lognormal dispersion for all the combinations.

344

The probability of collapse can be assessed at a given IM level, x can then be determined as

345

a part of records for which collapse occurs at a level lower than x. Fragility function parameters

346

can be assessed from the regression analyses of their median θ, and dispersion β, values, and by

347

taking the logarithm of each ground motion’s IM value related to the onset of collapse.

348

Based on the obtained collapse mode of IDA results and using fragility curves, the

349

probability of collapse of all the combination of parameters is plotted in Figure 24 - Figure 29. In

350

order to compare the obtained probability of collapse for the combination of different

351

parameters, these curves are plotted together and presented in one figure. In Figure 24 - Figure

352

29, the curve drawn with a black solid line indicates a higher collapse fragility, and the dotted

353

red line shows a lower collapse fragility as obtained by fitting the lognormal distribution to the

354

data. These data are obtained from the IDAs results. It can be observed from the Figure 24 -

355

Figure 29 that the probability of collapse of the lower value has a significant shift to the left and

356

has a smaller PGA for a specific probability of collapse. It leads to an increase in the probability

357

of collapse for a given seismicity. In Figure 24 - Figure 29, SCT represents the median collapse

358

probability.

359

6.1 Effect of compressive strength of concrete on collapse fragility curve

360

Figure 24 shows the effect of concrete compressive strength on the collapse fragility of

361

retrofitted bridge piers based on the maximum collapse drift ratio. The solid black line and the

362

red dotted line represent the probability of collapse with the specified compressive strength of

363

concrete of 35 and 20 MPa, respectively. The fragility curve clearly demonstrates the probability

364

of structural collapse for measuring definite intensity. From Figure 24, it can be observed that the

16

365

difference between fragility curves of 35, and 20 MPa concrete is significant. It is important to

366

note that 35MPa concrete pier is more fragile compared to 20MPa concrete piers. For instance,

367

as shown in Table 6, for the peak ground intensity levels, PGA in the range of 0.5g-2.0g, the

368

relative probability of collapse of 35MPa concrete pier is higher compared to 20MPa concrete

369

pier. 35 MPa concrete pier has higher stiffness that attracts more seismic forces causing more

370

damages to the pier compared to the 20 MPa concrete pier. Since 20 MPa concrete has lower

371

modulus of elasticity compared to 30 MPa concrete, larger strain experienced by the 20 MPa

372

concrete activated the FRP composite confinement and thus, was more effective in resisting

373

seismic forces compared to the 30 MPa concrete at similar drift level. From Figure 24, it can be

374

observed that the 20 MPa concrete pier will have 50% probability of collapse at a PGA value of

375

1.1g whereas the 35 MPa concrete will be able to sustain an earthquake with a PGA of only

376

0.72g to experience similar damage level. In other words, during an earthquake with a PGA of

377

0.72g the probability of collapse of the 20 MPa concrete is only 20% whereas for the 35 MPa

378

concrete it is 50%.

379

6.2 Effect of yield strength of steel reinforcement on collapse fragility

380

Figure 25 shows the effect of yield strength of longitudinal reinforcement on the collapse

381

fragility of retrofitted bridge piers based on maximum collapse drift ratio. The solid black line

382

and the red dotted line indicates the probability of collapse fragility with the yield strength of

383

longitudinal reinforcement of 400, and 250MPa, respectively. The fragility curve clearly

384

demonstrates the probability of structural collapse for measuring definite intensity. From Figure

385

25, it can be observed that the difference between fragility curves of 400, and 250 MPa

386

reinforcements are significant. For example, as shown in Table 6, for the peak ground intensity

387

levels, PGA, in the range of 0.5g-2.0g, the relative probability of collapse for the 400 MPa steel

17

388

RC pier is lower compared to the 250 MPa steel RC pier. For the intensity level of 2.0g, the

389

difference in the collapse probabilities is insignificant. Since both steel has the same modulus of

390

elasticity, the 400 MPa steel experiences yielding at a much larger strain value compared to the

391

250 MPa steel. Hence, the 400 MPa steel gets an added advantage to experience lower damage

392

level at the same ground motion level compared to the 400 MPa steel. From Figure 25, it can be

393

observed that the 400 MPa steel RC pier will have 50% probability of collapse at a PGA value of

394

0.71g whereas the 250 MPa steel RC pier will be able to sustain an earthquake with a PGA of

395

only 0.62g. In other words, during an earthquake with a PGA of 0.62g the probability of collapse

396

of the 400 MPa steel is 40% whereas for the 250 MPa steel it is 50%.

397

6.3 Effect of amount of longitudinal reinforcement on collapse fragility

398

Figure 26 shows the effect of the amount of longitudinal reinforcement on the collapse fragility

399

of retrofitted bridge piers. The solid black line and the red dotted line represents the probability

400

of collapse of the amount of longitudinal reinforcement of 1, and 2.5%, respectively. The

401

fragility curve clearly demonstrates the probability of structural collapse for measuring definite

402

intensity. From Figure 26, it can be observed that the difference between fragility curves with the

403

longitudinal reinforcement of 2.5% is significant compared to 1% reinforcement. Larger amount

404

of rebar increases the stiffness and strength of the pier and hence, it experiences lesser

405

deformation compared to the pier having reduced amount of longitudinal bar. As shown in Table

406

6, for the peak ground intensity levels, PGA, in the range of 0.5g-2.0g, the relative probability of

407

collapse for the 2.5% longitudinal steel is lower compared to 1% longitudinal steel. From Figure

408

26, it can be observed that the 1% longitudinal steel pier will have 50% probability of collapse

409

even at a PGA value of 0.8g whereas the 2.5% steel RC pier will be able to sustain an earthquake

18

410

with a PGA of 1.22g. In other words, during an earthquake with a PGA of 0.8g the probability of

411

collapse of the 1% steel pier is 50% whereas for the 2.5% steel pier it is only 14%.

412

6.4 Effect of axial load on collapse fragility

413

Figure 27 shows the effect of axial load on the collapse fragility of retrofitted bridge piers based

414

on maximum collapse drift ratio. The solid black line and the red dotted line represent the

415

probability of collapse with the axial load ratios of 0.20 and 0.10, respectively. The fragility

416

curves clearly demonstrate the probability of structural collapse. From Figure 27, it can be

417

observed that the difference between fragility curves with the axial load ratios of 0.20 and 0.10 is

418

significant. For example, as shown in Table 6, for PGA values in the range of 0.5g-2.0g, the

419

relative probability of collapse at the axial load of 0.20 is higher compared to 0.10 axial load.

420

From Figure 6.26 it can be observed that the higher axial load pier will have 50% probability of

421

collapse at a PGA value of 0.9g whereas the lower axial load pier will be able to sustain an

422

earthquake with a PGA of 1.31g. In other words, during an earthquake with a PGA of 0.9g the

423

probability of collapse of the higher axial load pier is 50% whereas for the lower axial load pier

424

it is only 16%.

425

6.5 Effect of shear span-depth ratio on collapse fragility

426

Figure 28 shows the effect of shear span-depth ratio on collapse fragility of retrofitted bridge

427

piers. The solid black line and the red dotted line represent probabilities of collapse with the

428

shear span-depth ratios of 4 and 7, respectively. The fragility curves clearly demonstrate the

429

probability of structural collapse. From Figure 28, it can be observed that the difference between

430

fragility curves with shear span-depth ratios of 4 and 7 is not very significant. As shown in Table

431

6, for the peak ground intensity levels, PGA in the range of 0.5g-2.0g, the relative probability of

432

collapse at the shear span-depth ratio of 7 is lower compared to the shear span-depth ratio of

19

433

0.10. From Figure 6.27 it can be observed that the pier with larger shear span-depth ratio will

434

have 50% probability of collapse at a PGA value of 1.16g whereas the pier with lower shear

435

span-depth ratio will be able to sustain an earthquake with a PGA of only 1.24g. In other words,

436

during an earthquake with a PGA of 1.16g the probability of collapse of the larger shear span-

437

depth ratio is 50% whereas for the lower shear span-depth ratio it is 45%.

438

6.6 Effect of confinement on collapse fragility

439

Figure 29 shows the effect of FRP confinement on the collapse fragility of circular RC bridge

440

piers. The solid black line and the red dotted line represent the probabilities of collapse with 2

441

and 3 layers of FRP confinement, respectively. From Figure 29, it can be observed that the

442

difference between fragility curves for 2 and 3 layers of FRP confinement is insignificant at PGA

443

values beyond 1.5g. However, from 0.2g to 1.5g, there are some differences. As shown in Table

444

6, the relative probability of collapse for the 2 FRP confinement layers is higher compared to 3

445

layers of FRP confinement. From Figure 6.28 it can be observed that the 2 layer FRP pier will

446

have 50% probability of collapse at a PGA value of 0.75g whereas the 3 layer FRP pier will be

447

able to sustain an earthquake with a PGA of 0.82g. In other words, during an earthquake with a

448

PGA of 0.75g the probability of collapse of the 3 layer FRP pier is 44% whereas for the 2 layer

449

FRP pier it is 50%

450

The collapse probability difference, ∆, for fragilities of all combination of parameters are

451

reported in a bar chart (see Figure 31 and Figure 32) for four peak ground accelerations of 0.5g,

452

1.0g, 1.5g, and 2.0g. As expected with higher PGA values, the differences in collapse probability

453

gradually decrease.

20

454

6.7 Median peak ground acceleration

455

The median values of the intensity measure, PGA, for a different combination of FRP, retrofitted

456

bridge piers are given in Table 7 and the corresponding bar chart is depicted in Figure 33. The

457

median values of PGA are determined as a level of PGA at which the probability of collapse at

458

each pier reaches 50%. For the same level of collapse probability, lower values of median

459

correspond to the higher probability of collapse, hence it demonstrates that the pier with a lower

460

median value is more fragile compared to other piers. For example, piers with a concrete

461

compressive strength of 35 MPa, a reinforcement yield strength of 250 MPa, a longitudinal

462

reinforcement ratio of 1%, and axial load of 0.20, a shear span-depth ratio of 4, and 2

463

confinement layers have the lowest value of median, respectively, 0.72g, 0.62g, 0.79g, 0.90g,

464

1.16g and 0.78g. It demonstrates that the lowest median values of piers have the inferior

465

performance. It can be noted that the pier with 20MPa concrete gives higher median value of

466

1.1g. As a result, it indicates that the FRP confinement is more effective in 20MPa concrete

467

compared to 35MPa concrete (PGA = 0.72g) in the case of FRP retrofitted piers.

468

The relative difference between the median values of PGA is found to be 10% for 35 and 20

469

MPa concretes. It represents that the 35MPa concrete pier leads to a 10% higher fragility

470

compared to the 20 MPa concrete pier. It is because the FRP confinement is more effective for

471

20MPa concrete compared to the 35MPa concrete. Thus, it is concluded that the deficient pier

472

performance can be improved with FRP.

473

6.8 Performance evaluation of bridge piers

474

Results of IDA curve can be used to evaluate the collapse performance of the RC bridge piers.

475

The collapse median intensity (SCT) obtained from the fragility fitting curves (Figure 25 -Figure

476

30) and the performance of bridge piers can be assessed using collapse margin ratio (CMR) [31].

21

477

The CMR can be expressed at the ratio of the SCT to the design level earthquake intensity (SMT).

478

The CMR ratio is calculated by dividing the SCT by a specific level of SMT, which is equal to

479

0.185g, 0.256g and 0.363g for 10, 5, and 2% probabilities of exceedance in 50 years at the return

480

period of 475, 975 and 2475 years, respectively for Vancouver, British Columbia. Table 8

481

exhibits the CMR values for different combinations of parameters. From Table 8, it can be

482

observed that as the ground motion return period decreases the collapse probability of

483

exceedance increases. For instance, for a pier with a compressive strength of concrete of 35 MPa,

484

the collapse probability value under an earthquake with a return period of 2475 years is 1.98,

485

which is 3.38 and 2.11% lower than a return period of 975 and 475 years, respectively.

486

Observation from Table 8 revealed that, as the earthquake return period increases, its intensity

487

also increases. Hence, the probability of exceeding collapse of a certain pier will increase, which,

488

means that the median collapse spectral acceleration will increase with the increase of

489

earthquake return period. Since the spectral acceleration at maximum considered earthquake will

490

also increase with the increase of earthquake return period, the results presented in Table 8 show

491

the CMR values gradually decrease with increasing return period. For instance, when the yield

492

strength of longitudinal reinforcement increases, the CMR ratio increases from 3.35% to 3.84%

493

at 475 years return period. In the case of increasing compressive strength, the CMR ratio

494

decreases from 5.95% to 3.89% with a return period of 475 years. It is because of the lower

495

strength concrete (20 MPa); the FRP confinement is more effective compared to higher strength

496

(35 MPa) concrete.

497

7. Conclusions

498

The seismic fragility assessment of the bridge can be analyzed using fragility curve, which is a

499

method to estimate the probability of damage of the structure at specific levels of ground motion.

22

500

The piers are the most vulnerable structural element in the bridge structures, which have

501

significant contribution to the failure probability of the bridge system. This article presented the

502

nonlinear static pushover analyses (NSPA) and collapse fragility curves of non-seismically

503

designed RC circular bridge piers located in Vancouver, British Columbia, Canada with a

504

different combination of parameters. Probabilistic seismic demand models were produced using

505

the results obtained from the incremental dynamic analyses (IDA). Considering collapse drift as

506

demand parameter, fragility curves were generated with different parameters of non-seismically

507

designed RC circular bridge piers. It was observed that the amount of reinforcement, shear span-

508

depth ratio, and level of the axial load could significantly affect the collapse fragility curve of the

509

retrofitted bridge piers.

510 511 512

Based on the NSP and results obtained from IDA curves, and collapse fragility curve, the following conclusions can be drawn. 

513 514

It can be observed from the NSPA that higher values of parameters could increase the capacity of the piers.



It is observed that 35 MPa concrete increased the pier yield and crushing base shear

515

capacity by 14 and 8.3%, respectively; while the buckling and fracture base shear

516

capacities were decreased by 4.4 and 4.3% compared to 20MPa concrete.

517



For piers with 400 MPa yield strength of longitudinal reinforcements, yielding, crushing,

518

buckling and fracture base shear and displacement capacities increased by 24.3, 27.3,

519

30.1 and 4.5%, and 28.6, 15.4, 27.3, 6.8, and 4.7%, respectively, compared to those of the

520

pier with reinforcements having 250 MPa yield strength.

23

521



For piers with longitudinal reinforcement ratios of 2.5%, the yielding, crushing, buckling

522

and fracture base shear capacities improved by 44.9, 48.7, 55.8, and 56.1% compared to

523

those for 1% longitudinal reinforcement ratios.

524



For piers with longitudinal reinforcement ratios of 2.5%, the yielding, buckling and

525

fracture displacements increased by 14.3, 9.5, and 9.3%, respectively, but the crushing

526

displacement decreased by 14.3% compared to those for 1% longitudinal reinforcement

527

ratios.

528



529 530

It can be observed that at 20% axial load, the yielding, crushing, buckling, and fracture base shear increased by 41.5, 14.3, 7.4, and 7.2% compared to those for 10% axial loads.



The yielding displacement increased by 14.3% for 20% axial load compared to 10% axial

531

load, and crushing, buckling and fracture displacements were almost the same for 20 and

532

10% axial loads.

533



For the shear span-depth ratio of 7, yielding, crushing, buckling, and fracture base shears

534

decreased by 52.6, 44.3, 100.6, and 101.7%, respectively compared to those for 4 shear

535

span-depth ratio.

536



The shear span-depth ratio of 7 resulted in an increase in yielding, crushing, buckling and

537

fracture displacements by 57.1, 64.3, 67.4 and 65.9%, respectively compared to those of

538

4 shear span-depth ratios.

539



540 541 542

The dynamic pushover points closely coincided with the static pushover curves before the first yielding of the longitudinal reinforcement.



The dynamic pushover curved demonstrated higher base shear value compared to f the static pushover curves between first yielding and crushing of core concrete.

24

543



It can be observed that 35 MPa concrete pier is more fragile compared to 20 MPa

544

concrete piers. For PGA values in the range of 0.5g-2.0g, the relative probability of

545

collapse of 35MPa concrete pier is higher (in the range of 74.8-3.2% compared to 20MPa

546

concrete pier).

547



At PGA values from 0.5g to 2.0g, for 400 MPa yield strength, a relatively lower

548

probability of collapse (i.e. in the range of 79.8-4.3%) was observed compared to 250

549

MPa yield strength.

550



At PGAs from 0.5g-2.0g, a relatively lower probability of collapse was observed (i.e. in

551

the range of 83.5-3.2%) for the amount of longitudinal steel of 2.5% is compared to 1%

552

longitudinal steel.

553



At PGAs from 0.5g-2.0g, a relatively higher probability of collapse was observed (i.e. in

554

the range of 74.8-2.7%) for the axial load of 0.20 compared to 0.10 axial load. The higher

555

axial load reduced the deformability.

556



At PGAs from 0.5g-2.0g, a relatively lower probability of collapse was observed (i.e. in

557

the range of 64.8-2.4%) for the shear span-depth ratio of 7 compared to the shear span-

558

depth ratio of 4.

559



At PGAs from 0.5g-2.0g, a relatively higher probability of collapse was observed (i.e. in

560

the range of 77.7-3.4%) for 2 layers of FRP confinement compared to the 3 layers of

561

confinement.

562

Acknowledgements

563

The first author would like to acknowledge the financial support provided by MITACS and

564

POLYRAP Engineered Concrete Solutions, Kelowna, B.C., Canada under the accelerate Ph.D.

565

fellowship award No. IT03809, and Ministry of Human Resources Development (MHRD), Govt.

25

566

of India, New Delhi for the National Oversees Scholarship. The first author is also grateful to S.

567

V. National Institute of Technology (SV NIT), Surat, Govt. of India to grant the study leave for

568

the Ph.D. program at the University of British Columbia (UBC), Canada. The authors are

569

grateful to Dr. Farshad Hedayati Dezfuli of UBC for proof reading of the manuscript. The

570

authors are grateful to Dr. Solomon Tesfamariam from the School of Engineering, UBC for the

571

interpretation of collapse fragility results. . Moreover, the authors would like to thank the

572

unknown referees for their useful remarks and suggestions. The experimental results were

573

provided by Prof. Kazuhiko Kawashima, Professor Emeritus, Department of Civil Engineering,

574

Tokyo Institute of Technology, Japan, and Dr. Richelle G. Zafra, Department of Civil

575

Engineering/Associate Dean, College of Engineering and Agro-Industrial Technology University

576

of the Philippines Los Banos and they are gratefully acknowledged.

577

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[39] Baker JW. Efficient analytical fragility function fitting using dynamic structural analysis. Earthq Spectra 2015;31:579–99. [40] ATC. Seismic performance assess- ment of buildings: Volume 1 —Methodology. Applied Technology Council, FEMA P-58-1 , FEMA, Washington, DC, USA: 2012.

671 672

30

673

List of Figures

674

Figure 1 Specimen geometry and reinforcement detailing used in this study

675

Figure 2 Schematic of section discretization of a typical FRP-confined concrete element

676

Figure 3 Comparison of the force displacement relationship of the numerical and experimental

677

results (A) as-Built pier and (B) CFRP retrofitted pier

678

Figure 4 Results of pushover analysis considering different compressive strength of concrete

679

Figure 5 Results of pushover analysis considering different yield strength of reinforcement

680

Figure 6 Results of pushover analysis considering different longitudinal steel ratio

681

Figure 7 Results of Pushover analysis considering different axial load ratio

682

Figure 8 Results of pushover analysis considering different shear span-depth ratio

683

Figure 9 Results of pushover analysis considering different layer of FRP

684

Figure 10 A suit of 20 earthquake ground motion records (a) Response spectral acceleration (b)

685

percentile of response spectral acceleration of a suit of earthquake ground motion

686

records

687

Figure 11 Results of dynamic and static pushover curve for C-1-35

688

Figure 12 Dynamic and static pushover curve for C-1-20

689

Figure 13 Dynamic and static pushover curve for C-2-400

690

Figure 14 Results Dynamic and static pushover curve for C-2-250

691

Figure 15 Results of dynamic and static pushover curve for C-3-2.5

692

Figure 16 Results of dynamic and static pushover curve for C-3-1

693

Figure 17 Results of dynamic and static pushover curve for C-4-0.20

694

Figure 18 Results of dynamic and static pushover curve for C-4-0.10

695

Figure 19 Results of dynamic and static pushover curve for C-5-7

31

696

Figure 20 Results of dynamic and static pushover curve for C-5-4

697

Figure 21 Results of dynamic and static pushover curve for C-6-2

698

Figure 22 Results of dynamic and static pushover curve for C-6-3

699

Figure 23 IDA results used to identify IM values related with collapse of each ground motions of

700

all the bridge piers retrofitted with FRP

701

Figure 24 Linear regression models for the median and dispersion values from IDA results

702

Figure 25 Effect of concrete strength on collapse fragility

703

Figure 26 Effect of yield strength of longitudinal steel on collapse fragility

704

Figure 27 Effect of amount of longitudinal steel on collapse fragility

705

Figure 28 Effect of axial load on collapse fragility

706

Figure 29 Effect of shear span-depth ratio on collapse fragility

707

Figure 30 Effect of FRP confinement on collapse fragility

708

Figure 31 Collapse probability of the piers at four PGA, 0.5, g, 0.1.0g, 1.5g, and 2.0g

709

Figure 32 Difference between collapse probability of different parameters

710

Figure 33 Bar chart of median values of PGA for the piers with different parameters

711 712 713 714 715 716 717 718

32

719 720

Figure 1 Specimen geometry and reinforcement detailing used in this study

721 722 723 724 725 726 727 728 729 33

730

Deck mass

G

mm 2000 mm

734 735

1600 mm

N6

733

N5

N4

N3 N2

737

N6

Beam element

N5

FRP wraps fiber N4

Beam element

Confined core concrete fiber

N3

Fiber element N2

Zero length Spring element

400 mm

736

N7

N7

2 and 3 Layer of CFRP No FRP

260 mm

732

520 mm

731

400 mm

N1 N1

Reinforcement’s fiber Cover concrete fiber

1150 mm

738 739

(a) Pier schematic

(b) Pier model

(c) Fiber discretization

Figure 2 Schematic of section discretization of a typical FRP-confined concrete element

740 741 742 743 744 745 746 747 748 749 750 751 752

34

150

150

(a) As Built Pier

50 0 -50

-100 -150 -120

753

100 Lateral load (kN)

Lateral load (kN)

100

(b) 0.111mm-CFRP Wrapped Pier

Experimental Numerical -80 -40 0 40 80 Top lateral displacement (mm)

120

50 0 -50

-100 -150 -120

Experimental Numerical -80 -40 0 40 80 Top lateral displacement (mm)

120

754

Figure 3 Comparison of the force displacement relationship of the numerical and experimental

755

results (A) as-Built pier and (B) CFRP retrofitted Pier

756 757 758 759 760 761 762 763 764 765 766 767

35

100 f'c = 35 MPa

Base Shear (kN)

f'c = 20 MPa 75

Yielding Crushing Bucking Fracture

50

25

0 0 768 769

50

100 150 Top Displacement (mm)

200

Figure 4 Results of pushover analysis considering different compressive strength of concrete

770 771 772 773 774 775 776 777 778 779 780 781 782

36

100 fy = 400 Mpa Base Shear (kN)

fy = 250 Mpa 75

Yielding Crushing Bucking Fracture

50

25

0 0 783 784

50

100 150 Top Displacement (mm)

200

Figure 5 Results of pushover analysis considering different yield strength of reinforcement

785 786 787 788 789 790 791 792 793 794

37

795 796

Figure 6 Results of pushover analysis considering different longitudinal steel ratio

797 798 799 800 801 802 803 804 805 806 807 808 809 810

38

811 812

Figure 7 Results of Pushover analysis considering different axial load ratio

813 814 815 816 817 818 819 820 821 822 823 824

39

825 826

Figure 8 Results of pushover analysis considering different shear span-depth ratio

827 828 829 830 831 832 833 834 835 836 837 838

40

839 840

Figure 9 Results of pushover analysis considering different layer of FRP

841 842 843 844 845 846 847 848 849 850 851 852 853 854

41

EQ1 EQ4 EQ7 EQ10 EQ13 EQ16 EQ19

(a)

2.0

EQ2 EQ5 EQ8 EQ11 EQ14 EQ17 EQ20

EQ3 EQ6 EQ9 EQ12 EQ15 EQ18 Mean

1.5

(b)

75 Percentile 50 Percentile

2.0

25 Percentile

1.5

maxi. = 0.73g mini. = 0.22g

1.0

1.0

0.5

0.5

0.0

0.0 0

855

2.5 Spectral Acceleration (g)

Spectral Acceleration (g)

2.5

1

2 3 Period (sec)

4

0

1

2 Period (sec)

3

4

856

Figure 10 A suit of 20 earthquake ground motion records (a) Response spectral acceleration (b)

857

percentile of response spectral acceleration of a suit of earthquake ground motion records

858 859 860 861 862 863 864 865 866

42

160

Base Shear (kN)

C-1-35

Dynamic pushover points Static pushover curve

120

80

40

0 0 867 868

50

100 150 200 Top Displacement (mm)

250

300

Figure 11 Results of dynamic and static pushover curve for C-1-35

869 870 871 872 873 874 875 876 877 878 879 880

43

160

Base Shear (kN)

C-1-20

Dynamic pushover points Static pushover curve

120

80

40

0 0 881 882

50

100 150 200 Top Displacement (mm)

250

300

Figure 12 Dynamic and static pushover curve for C-1-20

883 884 885 886 887 888 889 890 891 892 893 894

44

Base Shear (kN)

160

C-2-400

Dynamic pushover points Static pushover curve

120

80

40

0 0 895 896

50

100 150 200 Top Displacement (mm)

250

300

Figure 13 Dynamic and static pushover curve for C-2-400

897 898 899 900 901 902 903 904 905 906 907 908

45

160

C-2-250

Dynamic pushover points

Base Shear (kN)

Static Pushover curve 120

80

40

0 0 909 910

50

100 150 200 Top Displacement (mm)

250

300

Figure 14 Results Dynamic and static pushover curve for C-2-250

911 912 913 914 915 916 917 918 919 920 921 922 923

46

125

C-3-2.5 Base Shear (kN)

100

Dynamic pushover points Static pushover curve

75 50 25 0 0

924 925

50

100 150 200 Top Displacement (mm)

250

300

Figure 15 Results of dynamic and static pushover curve for C-3-2.5

926 927 928 929 930 931 932 933 934 935 936 937

47

125

Dynamic pushover points

C-3-1

Static pushover curve

Base Shear (kN)

100 75 50 25 0 0 938 939

50

100 150 200 Top Displacement (mm)

250

300

Figure 16 Results of dynamic and static pushover curve for C-3-1

940 941 942 943 944 945 946 947 948 949 950 951 952 953

48

Base Shear (kN)

200

C-4-0.20 Dynamic pushover points Static pushover curve

150

100

50

0 0 954 955

50

100 150 200 Top Displacement (mm)

250

300

Figure 17 Results of dynamic and static pushover curve for C-4-0.20

956 957 958 959 960 961 962 963 964 965 966 967

49

200

Base Shear (kN)

C-4-0.10

Dynamic pushover points Static pushover curve

150

100

50

0 0 968 969

50

100 150 200 Top Displacement (mm)

250

300

Figure 18 Results of dynamic and static pushover curve for C-4-0.10

970 971 972 973 974 975 976 977 978 979 980 981

50

200 Dynamic pushover points

Base Shear (kN)

C-5-7

Static pushover curve

150

100

50

0 0 982 983

50

100 150 200 Top Displacement (mm)

250

300

Figure 19 Results of dynamic and static pushover curve for C-5-7

984 985 986 987 988 989 990 991 992 993 994 995

51

200 Dynamic pushover points

C-5-4 Base Shear (kN)

Static pushover curve 150

100

50

0 0 996 997

50

100 150 200 Top Displacement (mm)

250

300

Figure 20 Results of dynamic and static pushover curve for C-5-4

998 999 1000 1001 1002 1003 1004 1005 1006 1007 1008 1009 1010 1011

52

200 Dynamic pushover points

Base Shear (kN)

C-6-2

Static pushover curve

150

100

50

0 0 1012 1013

50

100 150 200 Top Displacement (mm)

250

300

Figure 21 Results of dynamic and static pushover curve for C-6-2

1014 1015 1016 1017 1018 1019 1020 1021 1022 1023 1024 1025 1026 1027

53

200 Dynamic pushover points

Base Shear (kN)

C-6-3

Static pushover curve

150

100

50

0 0 1028 1029

50

100 150 200 Top Displacement (mm)

250

300

Figure 22 Results of dynamic and static pushover curve for C-6-3

1030 1031 1032 1033 1034 1035 1036 1037

54

2.0

2.4

(a) C-1-35

2.0

1.6

1.6

1.2

PGA (g)

PGA (g)

(b) C-1-20

1.2

0.8

0.8 0.4

0.4

0.0

0.0 0

1038 2.0

4 8 12 16 Maximum Drift (%)

20

0

20

2.0

(c) C-2-400

(d) C-2-250

PGA (g)

1.6

PGA (g)

1.6 1.2

1.2

0.8

0.8

0.4

0.4

0.0

0.0 0

1039 3.0

3 6 9 12 Maximum Drift (%)

15

0 2.5

(e) C-3-2.5

2.5

4 8 12 16 Maximum Drift (%)

20

(f) C-3-1

2.0 PGA (g)

PGA (g)

2.0 1.5 1.0

1.5 1.0

0.5

0.5

0.0

0.0 0

1040

5 10 15 Maximum Drift (%)

4 8 12 16 Maximum Drift (%)

20

0

4 8 12 16 Maximum Drift (%)

20

55

3.0

3.0

(g) C-4-0.20

2.5

2.0

2.0

PGA (g)

PGA (g)

2.5

1.5

1.5 1.0

1.0

0.5

0.5

0.0

0.0 0

1041 3.0

4 8 12 16 Maximum Drift (%)

0

20 3.0

(i) C-5-7

2.5

2.5

2.0

2.0

5 10 15 Maximum Drift (%)

20

(j) Col-5-4

PGA (g)

PGA (g)

(h) C-4-0.10

1.5

1.5

1.0

1.0

0.5

0.5

0.0

0.0 0

1042 3.0

4 8 12 16 Maximum Drift (%)

20

0 3.0

(k) C-6-2

2.5

2.0

2.0

20

(l) C-6-3

PGA (g)

PGA (g)

2.5

4 8 12 16 Maximum Drift (%)

1.5

1.5 1.0

1.0

0.5

0.5

0.0

0.0 0

4 8 12 16 Maximum Drift (%)

20

0

4 8 12 16 Maximum Drift (%)

20

1043 1044 1045

Figure 23 IDA results used to identify IM values related with collapse of each ground motions

1046

of all the bridge piers retrofitted with FRP 56

1.0

1.0

(a) C-1-35

0.5 ln (PGA)

ln (PGA)

0.5 0.0 -0.5 -1.0

-2

-1

1047 1.0

0 X

1

y = 0.4749x + 0.0871 R² = 0.9828 -2

2 1.0

(c) C-2-400

-1

0 X

1

2

(d) C-2-250

0.5 ln (PGA)

ln (PGA)

-0.5

-1.5

0.5 0.0 -0.5 -1.0

-2

-1

1048 1.5

0 X

1

0.0 -0.5 -1.0

y = 0.5335x - 0.3364 R² = 0.9744

-1.5

y = 0.4939x - 0.1327 R² = 0.976

-1.5 -2

2 1.0

(e) C-3-2.5

1.0

-1

0 X

1

2

(f) C-3-1

0.5

0.5

ln (PGA)

ln (PGA)

0.0

-1.0

y = 0.551x - 0.3244 R² = 0.9746

-1.5

0.0 -0.5 -1.0

-2

-1

0 X

1

0.0 -0.5 -1.0

y = 0.4181x + 0.2038 R² = 0.965

-1.5 1049

(b) C-1-20

y = 0.5426x - 0.2411 R² = 0.9852

-1.5 2

-2

-1

0 X

1

2

57

1.0

1.5

(g) C-4-0.20

1.0 ln (PGA)

ln (PGA)

0.5 0.0 -0.5

0.0

-1.0

y = 0.4731x - 0.1056 R² = 0.9756

-1.5 -2

-1

1050 1.5

0 X

1

y = 0.3797x + 0.2686 R² = 0.9807

-1.5 2

-2 1.5

(i) C-5-7

1.0

1.0

0.5

0.5

ln (PGA)

ln (PGA)

0.5

-0.5

-1.0

0.0 -0.5

-1

0 X

1

2

(j) C-5-4

0.0 -0.5

-1.0

-1.0

y = 0.4454x + 0.2098 R² = 0.9829

-1.5 -2 1051

(h) C-4-0.10

-1

0 X

1

y = 0.4184x + 0.1491 R² = 0.9476

-1.5 2

-2

-1

0 X

1

2

58

1.5

(k) C-6-2

1.0

1.0

0.5

0.5

ln (PGA)

ln (PGA)

1.5

0.0 -0.5

0.0 -0.5

-1.0

y = 0.537x - 0.2835 R² = 0.9535

-1.5 -2

1052 1053

(l) C-6-3

-1.0 -1.5

y = 0.4949x - 0.2058 R² = 0.9401

-1

0 1 2 -2 -1 0 1 2 X X Figure 24 Linear regression models for the median and dispersion values from IDA results

1054

Probabilitty of Collapse

1.0 0.8

f'c = 20 MPa f'c = 35 MPa

0.6 SCT

0.4 0.2 0.0 0.0

1055 1056

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 25 Effect of concrete strength on collapse fragility

1057 1058 1059 1060 1061 59

1062 1063

Probabilitty of Collapse

1.0 0.8

fy = 250 MPa fy = 400 MPa

0.6 SCT

0.4 0.2 0.0 0.0

1064 1065

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 26 Effect of yield strength of longitudinal steel on collapse fragility

1066 1067 1068 1069 1070 1071 1072

60

Probabilitty of Collapse

1.0 0.8

ρl = 2.5 % ρl = 1 %

0.6 SCT

0.4 0.2 0.0 0.0

1073 1074

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 27 Effect of amount of longitudinal steel on collapse fragility

1075 1076 1077 1078 1079 1080 1081 1082 1083 1084 1085 1086 1087

61

Probabilitty of Collapse

1.0 0.8

P = 20 % P = 10 %

0.6 SCT

0.4 0.2 0.0 0.0

1088 1089

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 28 Effect of axial load on collapse fragility

1090 1091 1092 1093 1094 1095 1096

62

Probabilitty of Collapse

1.0 0.8

l/d = 7 l/d = 4

0.6 SCT

0.4 0.2 0.0 0.0

1097 1098

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 29 Effect of shear span-depth ratio on collapse fragility

1099 1100 1101 1102 1103 1104 1105 1106 1107 1108 1109

63

Probabilitty of Collapse

1.0 0.8

n=2 n=3

0.6 SCT

0.4 0.2 0.0 0.0

1110 1111

0.5

1.0 1.5 2.0 Peak Ground Acceleration (g)

2.5

3.0

Figure 30 Effect of FRP confinement on collapse fragility

1112 1113 1114 1115 1116 1117 1118

64

Probability of Collpase (%)

1.2

0.5g

1.0g

1.5g

2.0g

1.0 0.8 0.6 0.4 0.2

1119 1120

C-6-3

C-6-2

C-5-4

C-5-7

C-4-0.10

C-4-0.20

C-3-1

C-3-2.5

C-2-250

C-2-400

C-1-20

C-1-35

0.0

Pier-ID Variables Figure 31 Collapse probability of the piers at four PGA, 0.5, g, 0.1.0g, 1.5g, and 2.0g

1121 1122 1123 1124 1125 1126 1127 1128 1129 1130 1131

65

Probability Difference, ∆ (%)

100

f'c

fy

ρl

P

l/d

n

60 20 -20 -60

-100 0.5 1132 1133

1.0 1.5 Peak Ground Acceleration (g)

2.0

Figure 32 Difference between collapse probability of different parameters

1134 1135 1136 1137 1138 1139 1140 1141 1142 1143 1144 1145 1146 1147

66

1.6

Median Values of PGA at collapse 1.31 1.23

PGA (g)

1.23 1.16

1.10

1.2

0.90

0.8

0.79

0.71

0.72

0.76

0.82

0.62

1148 1149

C-6-3

C-6-2

C-5-4

C-5-7

C-4-0.10

C-4-0.20

C-3-1

C-3-2.5

C-2-250

C-2-400

C-1-20

0.0

C-1-35

0.4

Pier-ID Figure 33 Bar chart of median values of PGA for the piers with different parameters

1150 1151 1152 1153 1154 1155 1156 1157 1158 1159 1160 1161 1162 1163

67

1164

List of Tables

1165

Table 1 Details of variable parameters considered in this study

1166

Table 2 Details of FRP retrofitted bridge piers

1167

Table 3 Base shear and displacement at different limit states

1168

Table 4 Characteristic of ground motion records used in IDA [31]

1169

Table 5 Median and dispersion values from the results of IDA using regression analysis

1170

Table 6 Collapse probability of different variables at PGAs of 0.5, 1.0, 1.5 and 2.0g

1171

Table 7 Median values of PGA for piers with different parameters

1172

Table 8 Collapse margin ratio (CMR) for collapse safety of piers

1173

Table A1 Failure drift of piers based on IDA results

1174 1175 1176 1177 1178 1179 1180 1181 1182 1183 1184 1185 1186

68

1187

Table 1 Details of variable parameters considered in this study Modeling factors/parameters Code Values Units ' A 20 35 (MPa) Compressive strength of concrete, ( f c ) Yield strength of steel, (fy) B 250 400 (MPa) Longitudinal steel reinforcement ratio, (ρl) C 1 2.5 (%) Axial load, (P) D 10 20 (%) Shear span-depth ratio, (l/d) E 4 7 -FRP confinement layer, (n) F 2 3 No.

1188 1189 1190 1191 1192 1193 1194 1195 1196 1197 1198 1199 1200 1201 1202 1203 1204 1205 1206 69

Table 2 Details of FRP retrofitted bridge piers

1207

f c'

fy ρl P= ' /A fc g (MPa) (MPa) (%) Compressive C-1-35 35 400 2.5 0.20 ' strength, f c C-1-20 20 400 2.5 0.20 C-2-400 35 400 1 0.20 Yield strength, fy C-2-250 35 250 1 0.20 C-3-2.5 35 400 2.5 0.10 Longitudinal reinforcement, ρl C-3-1 35 400 1 0.10 C-4-0.20 35 400 2.5 0.20 Axial load, P C-4-0.10 35 400 2.5 0.10 C-5-7 35 400 2.5 0.10 Shear span-depth ratio, l/d C-5-4 35 400 2.5 0.10 35 250 2.5 0.20 FRP confinement C-6-2 layer, n C-6-3 35 250 2.5 0.20 Variable

Pier-ID

l/d 2800/400 2800/400 2800/400 2800/400 2800/400 2800/400 1600/400 1600/400 2800/400 1600/400 1600/400 1600/400

n (No.) 3 3 3 3 3 3 3 3 2 2 2 3

1208 1209 1210 1211 1212 1213 1214 1215 1216 1217 1218 1219 1220 1221

70

Table 3 Base shear and displacement at different limit states

1222

Variable

Pier-ID

Compressive strength

C-1-35 C-1-20 C-2-400 C-2-250 C-3-2.5 C-3-1 C-4-0.20 C-4-0.10 C-5-7 C-5-4 C-6-2

Yield strength Longitudinal reinforcement Axial load Shear spandepth ratio FRP confinement layer

C-6-3

Yielding Base Disp. shear (mm) (kN) 28 63.15 28 55.26 28 63.09 20 47.74 28 58.08 24 31.99 12 133.74 8 94.52 28 56.77 12 119.87 8 97.16 8

97.17

Crushing Base Disp. shear (mm) (kN) 52 74.50 56 68.78 52 74.62 44 54.26 56 71.11 64 36.47 20 138.94 20 129.08 56 69.15 20 124.20 16 107.44 16

105.69

Bucking Base Disp. shear (mm) (kN) 172 60.02 180 63.60 176 57.55 164 40.23 168 66.99 152 29.58 56 138.63 56 133.78 172 65.41 56 131.22 56 102.62 56

103.17

Fracture Base Disp. shear (mm) (kN) 176 59.56 184 63.38 176 57.55 168 38.92 172 66.88 156 29.35 60 138.50 56 133.78 176 65.28 60 131.68 56 102.62 56

103.17

1223 1224 1225 1226 1227 1228 1229 1230 1231 1232 1233 1234 1235 1236 71

Table 4 Characteristic of ground motion records used in IDA [31]

1237

EQ No. Mw Year Earthquake Name 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20

6.7 7.3 6.7 7.3 7.1 6.9 7.1 6.9 6.5 7.4 6.5 6.5 6.9 6.5 6.9 7.0 7.5 7.6 7.5 7.6

1994 1992 1994 1992 1999 1989 1999 1989 1979 1990 1979 1987 1995 1987 1995 1992 1999 1999 1999 1999

Northridge Landers Northridge Landers Duzce, Turkey Loma Prieta Hector Mine Loma Prieta Imperial Valley Manjil, Iran Imperial Valley Superstition Hills Kobe, Japan Superstition Hills Kobe, Japan Cape Mendocino Kocaeli, Turkey Chi-Chi, Taiwan Kocaeli, Turkey Chi-Chi, Taiwan

Earthquake Recording R PGAmax PGV (cm/s) Station (km) (g) Beverly Hills - Mulhol 13.3 0.42 58.95 Yermo Fire Station 86.0 0.24 52.00 Canyon Country-WLC 26.5 0.41 42.97 Coolwater 82.1 0.28 26.00 Bolu 41.3 0.73 56.44 Capitola 9.80 0.53 35.00 Hector 26.5 0.27 28.56 Gilroy Array #3 31.4 0.56 36.00 Delta 33.7 0.24 26.00 Abbar 40.4 0.51 43.00 El Centro Array #11 29.4 0.36 34.44 El Centro Imp. Co. 35.8 0.36 46.00 Nishi-Akashi 8.70 0.51 37.28 Poe Road (temp) 11.2 0.45 36.00 Shin-Osaka 46.0 0.24 38.00 Rio Dell Overpass 22.7 0.39 44.00 Duzce 98.2 0.31 59.00 CHY101 32.0 0.35 71.00 Arcelik 53.7 0.22 17.69 TCU045 77.5 0.47 37.00

1238 1239 1240 1241 1242 1243 1244 1245 1246 1247 1248

72

1249

Table 5 Median and dispersion values from the results of IDA using regression analysis Variable Compressive strength

Pier-ID Median (θ) Dispersion (β) C-1-35 -0.32 0.55 C-1-20 0.09 0.47 C-2-400 0.20 0.42 Yield strength C-2-250 -0.24 0.54 C-3-2.5 -0.11 0.47 Longitudinal reinforcement C-3-1 -0.21 0.49 C-4-0.20 0.27 0.38 Axial load C-4-0.10 -0.34 0.53 -0.48 0.59 Shear span-depth C-5-7 ratio C-5-4 0.21 0.45 -0.28 0.54 FRP confinement C-6-2 layer C-6-3 0.15 0.42

R2 0.97 0.98 0.97 0.99 0.98 0.94 0.98 0.97 0.99 0.98 0.95 0.95

1250 1251 1252 1253 1254 1255 1256 1257 1258 1259 1260 1261 1262 1263 1264 1265 73

1266

Table 6 Collapse probability of different variables at PGAs of 0.5, 1.0, 1.5 and 2.0g 0.5g Pc ∆ (%) C-1-35 0.25 Compressive strength C-1-20 0.05 -74.8 C-2-400 0.02 Yield strength C-2-250 0.20 79.8 C-3-2.5 0.11 Longitudinal reinforcement C-3-1 0.16 83.8 C-4-0.20 0.01 Axial load C-4-0.10 0.25 -74.8 0.36 Shear span-depth C-5-7 ratio C-5-4 0.02 64.2 0.22 FRP confinement C-6-2 layer C-6-3 0.02 -77.7 Variable

1267 1268 1269

Pier-ID

1.0g Pc ∆ (%) 0.72 0.43 -27.8 0.31 0.67 32.8 0.59 0.66 33.9 0.24 0.74 -26.4 0.79 0.32 21.0 0.70 0.36 -29.9

1.5g Pc ∆ (%) 0.91 0.75 -9.3 0.69 0.88 11.7 0.86 0.89 10.8 0.64 0.92 -8.2 0.93 0.67 6.8 0.90 0.73 -10.0

2.0g Pc ∆ (%) 0.97 0.90 -3.2 0.88 0.96 4.3 0.95 0.97 3.5 0.87 0.97 -2.7 0.98 0.86 2.4 0.97 0.90 -3.4

Pc: probability of collapse, (- negative sign indicates the reduction in the probability of damage) ∆: relative difference between collapse probabilities of different parameters

1270 1271 1272 1273 1274 1275 1276 1277 1278 1279 1280 1281 1282

74

1283

Table 7 Median values of PGA for piers with different parameters Variable Compressive strength

Pier-ID C-1-35 C-1-20 C-2-400 Yield strength C-2-250 C-3-2.5 Longitudinal reinforcement C-3-1 C-4-0.20 Axial load C-4-0.10 Shear span-depth C-5-7 ratio C-5-4 FRP confinement C-6-2 layer C-6-3 1284 1285 1286

Pc ∆ 0.72g 1.10g -10 0.71g 0.62g 29 1.23g 0.79g 23 0.90g 1.31g 31 1.23g 1.16g 23 0.76g 0.82g -18

Pc: probability of collapse, ∆: relative difference between collapse probabilities of different parameters

1287 1288 1289 1290 1291 1292 1293 1294 1295 1296 1297 1298 1299 1300 75

1301

Table 8 Collapse margin ratio (CMR) for collapse safety of piers Probability of Exceedance of collapse 10% in 50 years 5% in 50 years 2% in 50 years Compressive C-1-35 3.89 2.81 1.98 strength C-1-20 5.95 4.30 3.03 C-2-400 3.84 2.77 1.96 Yield strength C-2-250 3.35 2.42 1.71 Longitudinal C-3-2.5 6.65 4.80 3.39 reinforcement C-3-1 4.27 3.09 2.18 C-4-0.20 4.86 3.52 2.48 Axial load C-4-0.10 7.08 5.12 3.61 Shear span-depth C-5-7 6.65 4.80 3.39 ratio C-5-4 6.27 4.53 3.20 FRP confinement C-6-2 4.08 2.95 2.08 layer C-6-3 4.43 3.20 2.26 Variable

Pier-ID

1302 1303 1304 1305 1306 1307 1308 1309 1310 1311 1312 1313 1314 1315 1316 1317 1318

76

1319

Appendix A Table A1 Failure drift of piers based on IDA results

1320 Variables Ground Motion

Northridge Landers Northridge Landers Duzce, Turkey Loma Prieta Hector Mine Loma Prieta Imperial Valley Manjil, Iran Imperial Valley Superstition Hills Kobe, Japan Superstition Hills Kobe, Japan Cape Mendocino Kocaeli, Turkey Chi-Chi, Taiwan Kocaeli, Turkey Chi-Chi, Taiwan

1321 1322

PGA (g) 0.46 0.26 0.86 0.98 0.88 0.58 0.76 2.02 0.53 1.17 0.68 0.68 1.22 1.17 0.46 0.43 0.47 0.39 0.86 1.27

Compressive strength Drift PGA Drift (%) (g) (%) 9.25 1.80 13.92 6.84 0.48 8.67 10.07 1.23 13.98 10.48 1.12 6.67 9.27 1.31 11.09 7.58 0.95 13.92 10.48 1.03 14.38 7.28 2.24 12.67 6.89 0.91 11.62 10.47 1.53 14.12 13.57 1.01 11.67 10.51 1.22 18.84 9.78 2.04 10.73 8.42 1.80 11.21 8.61 0.62 12.22 7.56 0.70 15.37 11.48 0.68 10.55 5.22 0.70 9.50 4.16 0.88 3.07 17.00 1.69 16.41

PGA (g) 0.50 0.26 0.86 1.12 0.95 0.58 0.72 1.57 0.56 0.97 0.63 0.68 1.28 1.19 0.46 0.39 0.45 0.40 1.11 1.18

Yield strength Drift PGA (%) (g) 10.71 0.42 7.37 0.22 12.46 0.66 10.80 0.70 10.26 0.95 7.70 0.69 7.16 0.63 4.80 1.90 8.41 0.46 6.44 0.87 8.60 0.52 10.76 0.58 10.77 1.05 9.73 1.06 8.80 0.42 6.23 0.35 11.18 0.36 7.75 0.32 6.15 1.31 11.21 0.75

Drift (%) 8.81 7.36 8.31 5.87 9.95 6.38 7.29 6.71 7.31 8.49 20.50 9.56 7.97 14.46 7.81 6.49 7.83 8.25 10.54 4.11

Reinforcement ratio PGA Drift PGA Drift (g) (%) (g) (%) 0.99 10.03 0.55 11.49 0.60 5.95 0.35 9.71 1.52 9.84 0.84 10.78 1.18 3.83 0.87 11.01 1.83 9.71 0.95 10.40 1.25 9.15 0.77 9.38 1.27 8.53 0.80 9.26 2.63 8.53 1.82 5.71 0.96 4.63 0.58 9.84 1.94 9.53 1.22 11.64 1.30 7.31 0.65 9.61 0.94 7.85 0.72 11.87 2.04 6.72 2.04 13.92 2.07 6.82 1.19 10.34 0.86 9.21 0.49 9.61 0.80 8.38 0.45 7.48 0.93 8.04 0.50 12.61 0.88 7.11 0.42 10.55 1.10 1.86 1.32 9.48 1.25 3.66 1.13 8.69

Table A1 Cont. Variables Ground Motion

Northridge Landers Northridge Landers Duzce, Turkey Loma Prieta Hector Mine Loma Prieta Imperial Valley Manjil, Iran Imperial Valley Superstition Hills Kobe, Japan Superstition Hills Kobe, Japan Cape Mendocino Kocaeli, Turkey Chi-Chi, Taiwan Kocaeli, Turkey Chi-Chi, Taiwan

Axial load PGA (g) 0.55 0.42 0.59 1.12 1.17 0.93 0.76 2.41 0.89 1.50 1.12 0.63 1.35 1.26 0.64 0.51 0.73 0.82 1.31 1.25

Drift (%) 13.27 7.27 8.55 10.95 10.81 10.01 10.98 13.78 10.59 11.74 9.93 10.68 12.84 10.27 9.80 7.46 10.18 9.90 5.83 11.95

PGA (g) 0.92 0.71 0.96 1.46 1.93 1.40 1.32 2.49 1.18 1.89 1.66 1.06 1.81 1.67 0.71 0.98 1.10 1.19 1.31 1.88

Shear span-depth ratio Drift (%) 19.01 7.41 8.47 9.88 9.56 10.78 10.38 9.75 9.89 14.02 8.71 8.49 13.69 11.63 9.86 10.23 8.61 9.64 3.27 11.54

PGA (g) 0.92 0.60 1.46 1.50 1.72 1.17 1.20 1.65 1.14 2.04 1.33 0.90 2.58 2.27 0.85 0.62 0.87 0.88 1.38 1.53

Drift (%) 15.76 13.28 16.21 9.17 15.58 12.47 13.63 8.16 14.17 15.62 13.65 13.04 16.45 13.89 14.39 8.56 12.28 13.73 4.03 8.01

PGA (g) 0.86 0.71 0.84 1.33 0.80 1.40 1.30 2.91 1.15 0.97 1.67 1.06 0.92 1.60 0.67 0.98 1.01 0.93 2.20 1.74

Drift (%) 15.02 7.42 7.19 8.69 3.22 10.67 10.33 10.93 9.49 3.88 9.59 9.05 4.58 11.63 10.13 12.13 8.07 4.11 9.86 10.02

CFRP layers PGA (g) 0.55 0.38 0.53 1.01 0.95 0.42 0.76 2.49 0.71 1.05 0.85 0.58 1.20 1.40 0.56 0.47 0.37 0.56 1.18 1.03

Drift (%) 13.38 10.31 8.07 11.18 10.86 3.29 12.07 13.36 13.25 6.72 10.50 10.24 12.70 13.83 10.07 8.85 3.41 7.38 4.06 9.08

PGA (g) 0.74 0.38 0.66 1.04 1.06 0.48 0.54 2.69 0.71 1.05 0.85 0.58 1.20 1.40 0.71 0.51 0.64 0.61 1.24 1.10

Drift (%) 13.18 10.14 11.52 11.62 12.92 3.86 6.18 14.92 10.47 6.53 10.23 10.14 12.42 11.83 13.68 10.05 11.41 11.43 4.55 10.72

1323 77